Cyclic conformally flat hypersurfaces revisited

Abstract

In this article we classify the conformally flat Euclidean hypersurfaces of dimension three with three distinct principal curvatures of R4, S3× R and H3× R with the property that the tangent component of the vector field ∂/∂ t is a principal direction at any point. Here ∂/∂ t stands for either a constant unit vector field in R4 or the unit vector field tangent to the factor R in the product spaces S3× R and H3× R, respectively. Then we use this result to give a simple proof of an alternative classification of the cyclic conformally flat hypersurfaces of R4, that is, the conformally flat hypersurfaces of R4 with three distinct principal curvatures such that the curvature lines correspondent to one of its principal curvatures are extrinsic circles. We also characterize the cyclic conformally flat hypersurfaces of R4 as those conformally flat hypersurfaces of dimension three with three distinct principal curvatures for which there exists a conformal Killing vector field of R4 whose tangent component is an eigenvector field correspondent to one of its principal curvatures.